- sage: set_random_seed()
- sage: n = ZZ.random_element(3)
- sage: F = QuadraticField(-1, 'I')
- sage: X = random_matrix(F, n)
- sage: Y = random_matrix(F, n)
- sage: Xe = ComplexMatrixEJA.real_embed(X)
- sage: Ye = ComplexMatrixEJA.real_embed(Y)
- sage: XYe = ComplexMatrixEJA.real_embed(X*Y)
- sage: Xe*Ye == XYe
- True
-
- """
- super().real_embed(M)
- n = M.nrows()
-
- # We don't need any adjoined elements...
- field = M.base_ring().base_ring()
-
- blocks = []
- for z in M.list():
- a = z.real()
- b = z.imag()
- blocks.append(matrix(field, 2, [ [ a, b],
- [-b, a] ]))
-
- return matrix.block(field, n, blocks)
-
-
- @classmethod
- def real_unembed(cls,M):
- """
- The inverse of _embed_complex_matrix().
-
- SETUP::
-
- sage: from mjo.eja.eja_algebra import ComplexMatrixEJA
-
- EXAMPLES::
-
- sage: A = matrix(QQ,[ [ 1, 2, 3, 4],
- ....: [-2, 1, -4, 3],
- ....: [ 9, 10, 11, 12],
- ....: [-10, 9, -12, 11] ])
- sage: ComplexMatrixEJA.real_unembed(A)
- [ 2*I + 1 4*I + 3]
- [ 10*I + 9 12*I + 11]
-
- TESTS:
-
- Unembedding is the inverse of embedding::
-
- sage: set_random_seed()
- sage: F = QuadraticField(-1, 'I')
- sage: M = random_matrix(F, 3)
- sage: Me = ComplexMatrixEJA.real_embed(M)
- sage: ComplexMatrixEJA.real_unembed(Me) == M
- True
-
- """
- super().real_unembed(M)
- n = ZZ(M.nrows())
- d = cls.dimension_over_reals()
- F = cls.complex_extension(M.base_ring())
- i = F.gen()
-
- # Go top-left to bottom-right (reading order), converting every
- # 2-by-2 block we see to a single complex element.
- elements = []
- for k in range(n/d):
- for j in range(n/d):
- submat = M[d*k:d*k+d,d*j:d*j+d]
- if submat[0,0] != submat[1,1]:
- raise ValueError('bad on-diagonal submatrix')
- if submat[0,1] != -submat[1,0]:
- raise ValueError('bad off-diagonal submatrix')
- z = submat[0,0] + submat[0,1]*i
- elements.append(z)
-
- return matrix(F, n/d, elements)
-
-
-class ComplexHermitianEJA(RationalBasisEJA, ConcreteEJA, ComplexMatrixEJA):
- """
- The rank-n simple EJA consisting of complex Hermitian n-by-n
- matrices over the real numbers, the usual symmetric Jordan product,
- and the real-part-of-trace inner product. It has dimension `n^2` over
- the reals.
-
- SETUP::
-
- sage: from mjo.eja.eja_algebra import ComplexHermitianEJA
-
- EXAMPLES:
-
- In theory, our "field" can be any subfield of the reals::
-
- sage: ComplexHermitianEJA(2, field=RDF, check_axioms=True)
- Euclidean Jordan algebra of dimension 4 over Real Double Field
- sage: ComplexHermitianEJA(2, field=RR, check_axioms=True)
- Euclidean Jordan algebra of dimension 4 over Real Field with
- 53 bits of precision
-
- TESTS:
-
- The dimension of this algebra is `n^2`::
-
- sage: set_random_seed()
- sage: n_max = ComplexHermitianEJA._max_random_instance_size()
- sage: n = ZZ.random_element(1, n_max)
- sage: J = ComplexHermitianEJA(n)
- sage: J.dimension() == n^2
- True
-
- The Jordan multiplication is what we think it is::
-
- sage: set_random_seed()
- sage: J = ComplexHermitianEJA.random_instance()
- sage: x,y = J.random_elements(2)
- sage: actual = (x*y).to_matrix()
- sage: X = x.to_matrix()
- sage: Y = y.to_matrix()
- sage: expected = (X*Y + Y*X)/2
- sage: actual == expected
- True
- sage: J(expected) == x*y
- True
-
- We can change the generator prefix::